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Homogenisation theory for Friedrichs systems (CROSBI ID 599865)

Prilog sa skupa u zborniku | sažetak izlaganja sa skupa | međunarodna recenzija

Burazin, Krešimir ; Vrdoljak ; Marko Homogenisation theory for Friedrichs systems // Applied Mathematics and Scientific Computing / Eduard Marušić-Paloka (ur.). Zagreb, 2013. str. 20-20

Podaci o odgovornosti

Burazin, Krešimir ; Vrdoljak ; Marko

engleski

Homogenisation theory for Friedrichs systems

General homogenisation theory was originally developed for the stationary diffusion equation. Considering a sequence of such problems, with common boundary conditions, the homogenisation theory asks the question of what form is the limiting equation? The notions of G- convergence of corresponding operators, and H-convergence (also known as strong G- convergence) of coefficients were introduced. Later, the similar questions were studied for parabolic problems, linearized elasticity problems etc. As Friedrichs systems can be used to represent various boundary value problems for (partial) differential equations, it is of interest to study homogenisation in such a wide framework, generalizing the known situations. Here we introduce concepts of G and H-convergence for Friedrichs systems, give compactness theorems under some compactness assumptions, and discuss some other interesting topics, such as convergence of adjoint operators, topology of H-convergence and possibility for appearance of nonlocal effects. Finally, we apply this results to the stationary diffusion equation, the heat equation, the linearized elasticity system, and a model example of first order equation leading to memory effects. In the first three cases, the equivalence with the original notion of H-convergence is proved. Here the Quadratic theorem of compensated compactness is used in order to verify our compactness assumptions.

symmetric positive system; homogenisation; G-convergence; H-convergence; stationary diffusion equation; heat equation

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Podaci o prilogu

20-20.

2013.

objavljeno

Podaci o matičnoj publikaciji

Applied Mathematics and Scientific Computing

Eduard Marušić-Paloka

Zagreb:

Podaci o skupu

8th Conference on Applied Mathematics and Scientific Computing

predavanje

10.07.2013-14.07.2013

Šibenik, Hrvatska

Povezanost rada

Matematika